` Ay^(2) + By + Cx + D = 0 ` be the equation of a parabola , then _

Show that x = ay^2 + by + c represents the equation of a parabola. Find the co-ordinate of its vertex and also find the length of its latus rectum

The parametric equations of the parabola y^(2) = 12x are _

The vertex of a parabola is (2, 2) and the coordinats of its two extremities of latus rectum are (-2,0) and (6, 0). Then find the equation of the parabola.

x - 1 = 0 is the equation of directrix of the parabola y^(2) - kx + 8 = 0 . Then the value of k is _

(viii) The graph of the equation cx+d=0 ( c and d are constant and c ne 0 ) will be the equation of the y-axis when

The axis of a parabola is parallel to x axis. If the the parabola passes through the point (2, 0), (1, -1) and (6, -2), then find the equation of the parabola.

The focus of a parabola is (1,5)and its directrix is x+y+2=0.Find the equation of parabola.Find its vertix and length of latus rectum.

The equation x^(2) - 2xy +y^(2) +3x +2 = 0 represents (a) a parabola (b) an ellipse (c) a hyperbola (d) pair of straight line

In each of the find the equation of the parabola that satisfies the given conditions : Vertex (0,0) , focus (-2,0)

If x=(3)/(k) be the equation of directrix of the parabola y ^(2) + 4 y + 4 x + 2 = 0 then , k is _